Arithemetic Mean,Geometric Mean and Harmonic Mean Inequality Part 2

Arithemetic Mean,Geometric Mean and Harmonic Mean Inequality Part 1

Arithemetic Mean,Geometric Mean and Harmonic Mean Inequality Part 1

Arithmetic Mean, Geometric Mean And Harmonic Mean Inequalities|Exercise Questions|OMR

If a, b and c are the arithmetic mean, geometric mean and harmonic mean of two distinct terms respectively, then b^(2) is equal to _______.

Arithemetic Series,Geometric Series and Harmonic Series Questions

Arithemetic Series,Geometric Series and Harmonic Series Questions

If arithmetic mean of two positive numbers is A, their geometric mean is G and harmonic mean H, then H is equal to

Statement-l: a and b are two numbers and A ,G,H represents Arthmetic,Geometric and Harmonic means between a and b.If A-G=(3)/(2) and G-H=(6)/(5) then the numbers are 24 and 6. Statement-II: The Arithmetic,Geometric and Harmonic means between a and b is (a+b)/(2),sqrt(ab) and (2ab)/(a+b)